Results on the spectral stability of standing wave solutions of the Soler model in 1-D

Abstract

We study the spectral stability of the nonlinear Dirac operator in dimension 1+1, restricting our attention to nonlinearities of the form f(,β C2) β. We obtain bounds on eigenvalues for the linearized operator around standing wave solutions of the form e-iω t φ0. For the case of power nonlinearities f(s)= s |s|p-1, p>0, we obtain a range of frequencies ω such that the linearized operator has no unstable eigenvalues on the axes of the complex plane. As a crucial part of the proofs, we obtain a detailed description of the spectra of the self-adjoint blocks in the linearized operator. In particular, we show that the condition φ0,β φ0C2 > 0 characterizes groundstates analogously to the Schr\"odinger case.